# List all possible 4 chooses from 9 in Haskell

I'm not able to find an effective way to pick out all permutations of 4 elements from a list of 9 elements in Haskell. The python-way to do the same thing:

``````itertools.permutations(range(9+1),4)
``````

An not so effective way to do it in Haskell:

``````nub . (map (take 4)) . permutations \$ [1..9]
``````

I would like to find something like:

``````permutations 4 [1..9]
``````
-
here is a similar SO question which can address this problem: stackoverflow.com/questions/9831374/… –  user5402 Aug 1 '12 at 20:06
@user5402 sorry I'm not that hax at Haskell (yet), I can't really see the resemblance. –  SlimJim Aug 2 '12 at 7:16

Here is my solution:

``````import Control.Arrow

select :: [a] -> [(a, [a])]
select [] = []
select (x:xs) = (x, xs) : map (second (x:)) (select xs)

perms :: Int -> [a] -> [[a]]
perms 0 _  = [[]]
perms n xs = do
(y, ys) <- select xs
fmap (y:) (perms (n - 1) ys)
``````

It's very lazy and even works for infinite lists, although the output there is not very useful. I didn't bother implementing diagonalization or something like that. For finite lists it's fine.

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Without using `Control.Arrow`, `select` can be written as: `select (x:xs) = (x,xs) : [ (y,x:ys) | (y,ys) <- select xs ]`, with the additional base case: `select [x] = [(x,[])]`. –  lbolla Aug 1 '12 at 21:05
@Ibolla: your "additional base case" is already covered by `select [] = []` –  newacct Aug 2 '12 at 0:31
@newacct: no, my additional base case is `select [x]`, not `select []`. –  lbolla Aug 2 '12 at 10:46
@Ibolla: but `select [x]` is `select (x:[])`, which by your recursive case becomes `select (x:[]) = (x,[]) : [(y,x:ys) | (y,ys) <- select []]`. Since we already have `select [] = []`, that list comprehension becomes `[]`, so we get `(x,[]) : []`, which is the same as `[(x,[])]` –  newacct Aug 2 '12 at 18:21
``````replicateM 4 [1..9]
``````

Will do this for you, I believe. It's in `Control.Monad`.

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`replicateM` doesn't produce lists of distinct elements, though –  user5402 Aug 1 '12 at 21:52

``````import Data.List (delete)

perms :: (Eq a) => Int -> [a] -> [[a]]
perms 0 _  = [[]]
perms _ [] = [[]]
perms n xs = [ (x:ys) | x <- xs, ys <- perms (n-1) (delete x xs) ]
``````

Basically, it says, a permutation of n elements from a set is, pick any element as the first element of the result, then the rest is a permutation of n-1 elements from the rest of the set. Plus some base cases. Assumes that elements in the list are unique.

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But that's slower than ertes' solution, and the `Eq` constraint isn't really nice. –  leftaroundabout Aug 2 '12 at 0:09
``````pick :: Int -> [a] -> [[a]]